Problem 1. True/False. For each of the following statements, determine whether they are true or false. If true, you must provide a short proof of that statement. If false, you must provide a counterexample and justify why it is a counterexample to that statement. No marks will be given for unjustified "true" or "false" answers. (a) The element 6 + i is irreducible in the ring Zli] of Gaussian integers. (b) The element 17 is irreducible in the ring Z[i] of Gaussian integers. (c) There is no element of order 4 in the symmetric group Ss. (d) There is no element of order 4 in the alternating group As.

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Problem 1. True/False. For each of the following statements, determine whether they are true or false. If true, you must provide a short proof of that statement. If false, you must provide a counterexample and justify why it is a counterexample to that statement. No marks will be given for unjustified "true" or "false" answers. (a) The element 6+ i is irreducible in the ring Z[i] of Gaussian integers. (b) The element 17 is irreducible in the ring Z[i] of Gaussian integers. (c) There is no element of order 4 in the symmetric group S3. (d) There is no element of order 4 in the alternating group A5. Problem 2. Consider the multiplicative group Z, of invertible elements of the ring Z16. (a) Give a list of all the elements of Z, (justify your reasoning). Each of them must be written in the form k for some k E (0,..., 15}. (b) Show that for every a E Z, we have a? = I (c) Use part (b) to deduce that a = ī for every a E Z. Is Z a cyclic group? or